CLOSED-FORM AND NUMERICALLY-STABLE SOLUTIONS TO PROBLEMS RELATED TO THE OPTIMAL TWO-IMPULSE TRANSFER BETWEEN SPECIFIED TERMINAL STATES OF KEPLERIAN ORBITS

The first part of the paper presents some closed-form solutions to the optimal two-impulse transfer between fixed position and velocity vectors on Keplerian orbits when some constraints are imposed on the magnitude of the initial and final impulses. Additionally, a numerically-stable gradient-free algorithm with guaranteed convergence is presented for the minimum delta-v two-impulse transfer. In the second part of the paper, cooperative bargaining theory is used to solve some two-impulse transfer problems when the initial and final impulses are carried by different vehicles or when the goal is to minimize the delta-v and the time-of-flight at the same time.